Nonresonant micromachined gyroscopes with structural mode-decoupling

ABSTRACT

A four-degrees-of-freedom (DOF) nonresonant micromachined gyroscope utilizes a dynamical amplification both in the 2-DOF drive-direction oscillator and the 2-DOF sense-direction oscillator, which are structurally decoupled, to achieve large oscillation amplitudes without resonance. The overall 4-DOF dynamical system is comprised of three proof masses. The second and third masses form the 2-DOF sense-direction oscillator. The first mass and the combination of the second and third masses form the 2-DOF drive-direction oscillator. The frequency responses of the drive and sense-mode oscillators have two resonant peaks and a flat region between the peaks. The device is nominally operated in the flat regions of the response curves belonging to the drive and sense-mode oscillators, where the gain is less sensitive to frequency fluctuations. This is achieved by designing the drive and sense anti-resonance frequencies to match.

BACKGROUND OF THE INVENTION

1. Field of the Invention

The invention relates to micromachined gyroscopes and in particular to four-degrees-of-freedom (DOF) nonresonant micromachined gyroscopes having three proof masses.

2. Description of the Prior Art

Micromachined gyroscopes are projected to become a potential alternative to expensive and bulky conventional inertial sensors. With micromachining processes allowing mass-production of micromechanical systems on a chip together with their control and signal conditioning electronics, low-cost and microsized gyroscopes provide high accuracy rotation measurements leading to an even broader application spectrum, ranging from advanced automotive safety systems and on-chip navigation systems to interactive consumer electronics.

However, due to unfavorable effects of scaling, the current state of the art micromachined gyroscopes require an order of magnitude improvement in performance, stability, and robustness. The conventional micromachined rate gyroscopes operate on the vibratory principle of a two-degrees-of-freedom (DOF) system with a single proof mass suspended by flexures anchored to the substrate, which allow the mass to oscillate in two orthogonal directions, namely the drive and the sense directions. The proof mass is sustained in resonance in the drive direction, and in the presence of an angular rotation, the Coriolis force proportional to the input angular rate, is induced, exciting the proof mass in the sense direction. To achieve high sensitivity, the drive and the sense resonant frequencies are typically designed and tuned to match, and the device is controlled to operate at or near the peak of the response curve. To enhance the sensitivity further, the device is packaged in high vacuum, minimizing energy dissipation due to viscous effects of air surrounding the mechanical structure.

Extensive research has been focused on design of symmetric suspensions and resonator systems for the mode-matching and minimizing temperature dependence. However, especially for lightly-damped devices, the requirement for mode-matching is well beyond fabrication tolerances, and none of the symmetric designs can provide the required degree of mode-matching without active tuning and feedback control. Furthermore, the mechanical interference between the modes, and thus the operation instability and drift, are proportional to the degree of mode-matching. Various devices have been proposed employing independent flexures for driving and sensing mode oscillations to suppress coupled oscillation and the resulting zero-rate drift.

BRIEF SUMMARY OF THE INVENTION

In the illustrated embodiment of the invention, we propose a 4-DOF micromachined gyroscope system utilizing dynamical amplification to achieve large oscillation amplitudes without resonance, while mechanically decoupling the drive direction oscillations from the sense direction oscillations. The overall 4-DOF dynamical system is comprised of three proof masses. The 2-DOF sense-direction oscillator is made up of the second and third masses, designed to amplify response in the sense-mode. The first mass and the combination of the second and third masses form the 2-DOF drive-direction oscillator. The drive and sense-mode oscillators are mechanically decoupled, minimizing instability due to dynamical coupling between the drive and sense modes. The frequency response of both of the drive and sense-mode oscillators have two resonant peaks and a flat region between the peaks. By designing the drive and sense antiresonance frequencies to match, the flat-region frequency band of the oscillators are overlapped, defining the nominal operation region of the device, where the response gain is less sensitive to parameter variations.

Utilizing dynamical amplification in the 2-DOF oscillators instead of resonance, increased bandwidth and reduced sensitivity to structural and thermal parameter fluctuations and damping changes are achieved. The improved robustness and long-term stability over the operating time of the device is expected to relax control system requirements and tight fabrication and packaging tolerances.

More particularly, the invention is a 4-DOF nonresonant micromachined gyroscope comprising a 2-DOF drive-mode oscillator and a 2-DOF sense-mode oscillator, where the drive-mode oscillator and sense-mode oscillators are mechanically decoupled and employ three interconnected proof masses.

The 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator utilize dynamical amplification in the drive and sense directions to achieve large oscillation amplitudes without resonance resulting in increased bandwidth and reduced sensitivity to structural and thermal parameter fluctuations and damping changes.

One of the three masses is an intermediate proof mass and another is a sensing element. The 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator are mechanically decoupled in the drive direction from the sense direction for robustness and long-term stability. The Coriolis force that excites the sensing element is generated by the intermediate proof mass with a larger mass, resulting in larger Coriolis forces for increased sensor sensitivity so that control system requirements and tight fabrication and packaging tolerances are relaxed, mode-matching is eliminated, and instability and zero-rate drift due to mechanical coupling between the drive and sense modes is minimized.

The 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator include a drive means for driving a mass in a drive direction and a sense means for sensing motion of a mass in a sense direction. The three interconnected masses comprise a first, second and third mass. The first mass is the only mass excited by the drive means. The first mass oscillates in the drive direction and is constrained from movement in the sense direction. The second and third masses are constrained from movement with respect to each other in the drive direction and oscillate together in the drive direction but oscillating independently from each other in the sense direction. The third mass is fixed with respect to the second mass in the drive direction, but free to oscillate in the sense direction. The first mass acts as a driven mass and the second and third masses act collectively as an passive mass to comprise the drive-mode oscillator. The second and third masses comprise the sense-mode oscillator.

The second mass oscillates in the drive and sense directions to generate rotation-induced Coriolis force that excites the 2-DOF sense-mode oscillator. A sense direction response is derived from the third mass, which comprises the vibration absorber of the 2-DOF sense-mode oscillator, and is detected for measuring the input angular rate.

The 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator include an electrostatic drive for driving a mass in a drive direction, a capacitive sensor for sensing motion of a mass in a sense direction. The oscillators are mounted on a substrate. The three interconnected masses comprise a first, second and third mass in which the first mass is anchored to the substrate by a first flexure which allows movement substantially only in the drive direction, in which the second mass is coupled to the first mass by a second flexure that allows movement in the drive and the sense directions, and in which the third mass is coupled to the second mass by a third flexure which allows movement substantially only in the sense direction.

The first, and third flexures are folded micromachined springs having a resiliency substantially in only one direction. The second flexure is comprised of two coupled folded micromachined springs, each having a resiliency substantially in only one of two different directions.

The 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator each have two resonant peaks and a flat region between the peaks. The gyroscope is operated in the flat regions of the drive and sense-mode oscillators.

The 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator are arranged and configured to have matching drive and sense direction anti-resonance frequencies.

The second and the third masses combine to comprise a vibration absorber of the drive-mode oscillator, which vibration absorber mechanically amplifies the oscillations of the first mass.

The first mass is driven at a driving frequency, ω_(drive), by means of a input force F_(d), which driving frequency, ω_(drive), is matched with the resonant frequency of an isolated passive mass-spring system comprised of the second and third masses and coupled flexures. The passive mass-spring system moves to cancel out the input force F_(d) applied to the first mass, so that maximum dynamic amplification is achieved.

The third mass acts as the vibration absorber in the sense-mode oscillator to achieve large sense direction oscillation amplitudes due to mechanical amplification.

A sinusoidal Coriolis force is applied to the second mass, whose frequency is matched with a resonant frequency of the isolated passive mass-spring system of the third mass and its coupled flexures, so that the third mass achieves maximum dynamic amplification.

The frequency response of both the drive-mode oscillator and sense-mode oscillator have two resonant peaks and a flat region between the peaks. The drive-mode oscillator and sense-mode oscillator are both operated in the flat region of their response curves. The drive anti-resonance frequency, ω_(2x), of the second mass and sense anti-resonance frequency, ω_(3y), of the third mass are matched, namely ω_(3y)=ω_(2x), or equivalently (k_(3y)/m₃)^(1/2)=(k_(2x)/(m₂+m₃))^(1/2). This matching condition determines the optimal system parameters, together with the optimized ratios μ_(x)=(m₂+m₃)/m₁, γ_(x)=ω_(2x)/ω_(1x), μ_(y)=m₃/m₂, and γ_(y)=ω_(3y)/ω_(2y), where k_(3y) is the spring constant of the flexures coupled to the third mass, where m₃ is the magnitude of the third mass, k_(2x) is the spring constant of the flexures coupled to the second mass, m₂ is the magnitude of the second mass, m₃ is the magnitude of the third mass, ω_(1x) is the drive anti-resonance frequency of the first mass, and ω_(2y) is the sense anti-resonance frequency of the second mass.

While the apparatus and method has or will be described for the sake of grammatical fluidity with functional explanations, it is to be expressly understood that the claims, unless expressly formulated under 35 USC 112, are not to be construed as necessarily limited in any way by the construction of “means” or “steps” limitations, but are to be accorded the full scope of the meaning and equivalents of the definition provided by the claims under the judicial doctrine of equivalents, and in the case where the claims are expressly formulated under 35 USC 112 are to be accorded full statutory equivalents under 35 USC 112. The invention can be better visualized by turning now to the following drawings wherein like elements are referenced by like numerals.

BRIEF DESCRIPTION OF THE DRAWINGS

FIG. 1 is a conceptual schematic of the micromachined 4-DOF gyroscope with decoupled oscillation modes.

FIG. 2 is a diagram of a lumped mass-spring-damper model of the overall 4-DOF gyroscope dynamical system.

FIG. 3(a) is a graph of the x₂ and y₃ amplitudes as a function of driving frequency of the 2-DOF drive and sense-mode oscillators, with the overlapped flat regions.

FIG. 3(b) is a graph of the y₃ amplitudes as a function of driving frequency of the overall 4-DOF gyroscope system. The oscillation amplitude is relatively insensitive to parameter variations and damping fluctuations in the flat operating region in both FIGS. 3(a) and 3(b).

FIG. 4 is an enlargement of a portion of the suspension system configuration that forms the mechanically decoupled 2-DOF drive and sense-mode oscillators with the three proof masses.

FIG. 5(a) is a diagram of a lumped mass-spring-damper model for the 2-DOF drive-mode oscillator of the 4-DOF gyroscope.

FIG. 5(b) is a diagram of a lumped mass-spring-damper model for the 2-DOF sense-mode oscillator.

FIG. 6(a) is a graph of the x₂ amplitudes as a function of driving frequency of the 2-DOF drive-mode oscillator.

FIG. 6(b) is a graph of the y₃ amplitudes as a function of driving frequency of the 2-DOF sense-mode oscillator.

FIG. 7(a) is a graph of the x₂ amplitudes as a function of driving frequency for the dual mass oscillator showing the effect of variations in the passive mass (m₂+m₃).

FIG. 7(b) is a graph of the x₂ amplitudes as a function of driving frequency for the dual mass oscillator showing the effect of variations in antiresonant frequency ω_(2x) on drive direction response.

FIG. 8(a) is a graph of the x₂ amplitudes as a function of driving frequency for the dual mass oscillator showing the effect of variations in mass ratio μ_(x)=(m₂+m₃)=m₁.

FIG. 8(b) is a graph of the x₂ amplitudes as a function of driving frequency for the dual mass oscillator showing the effect of variations in frequency ratio γ_(x)=ω_(2x)/ω_(1x) on drive direction response.

FIG. 9 is a graph of the x₂ amplitudes as a function of driving frequency for the dual mass oscillator showing the effect of variations in damping on drive direction response. When the damping is under a critical value, the response in the flat region is insensitive to pressure changes.

The invention and its various embodiments can now be better understood by turning to the following detailed description of the preferred embodiments which are presented as illustrated examples of the invention defined in the claims. It is expressly understood that the invention as defined by the claims may be broader than the illustrated embodiments described below.

DETAILED DESCRIPTION OF THE PREFERRED EMBODIMENTS

First, we present a detailed analysis of the conventional gyroscope dynamics emphasizing the related challenges. Second, the design approach and the principle of operation are presented, together with a detailed comparison of the 4-DOF system characteristics to a conventional gyroscope. Third, the dynamics of the device is then analyzed, and fourth, a MEMS implementation of the design concept is presented along with an approach for determining optimal system parameters to maximize sensor performance.

1. Detailed Analysis Of The Conventional Gyroscope Dynamics

Almost all existing micromachined rate gyroscopes operate on the principle of rotation-induced Coriolis acceleration detection using a single vibrating proof mass suspended above the substrate. The proof mass is supported by anchored flexures, which serve as the flexible suspension between the proof mass and the substrate, making the mass free to oscillate in two orthogonal directions: the drive direction (-axis) and the sense direction (-axis). The overall dynamical system is simply a 2-DOF mass-spring-damper system, where the drive direction is excited by the sinusoidal electrostatic force, and the sense direction is excited by the rotation-induced Coriolis force. If the motion of a conventional single-mass gyroscope is decomposed into the two principle oscillation directions, the drive direction and the sense direction, the two equations of motion can be expressed as $\begin{matrix} {{{{m\quad\overset{\text{?}}{x}} + {c_{x}\overset{.}{x}} + {\left( {k_{z} - {m\left( {\Omega_{y}^{2} + \Omega_{z}^{2}} \right)}} \right)x} + {{m\left( {{\Omega_{x}\Omega_{y}} - {\overset{.}{\Omega}}_{z}} \right)}y}} = {F_{d} + {2m\quad{\overset{¨}{\Omega}}_{z}\overset{.}{y}}}}{{{m\quad\overset{¨}{y}} + {c_{y}\overset{.}{y}} + {\left( {k_{y} - {m\left( {\Omega_{x}^{2} + \Omega_{z}^{2}} \right)}} \right)y} + {{m\left( {{\Omega_{x}\Omega_{y}} + {\overset{.}{\Omega}}_{z}} \right)}x}} = {{- 2}m\quad{\overset{¨}{\Omega}}_{z}\overset{.}{x}}}{\text{?}\text{indicates text missing or illegible when filed}}} & (1) \end{matrix}$ where m is the proof mass, F_(d) is the drive direction excitation force, and ω=(Ω_(x), Ω_(y), Ω_(z)) is the input angular velocity vector. The two final terms 2 mΩ_(z)dy/dt and 2 mΩ_(z)dx/dt are the rotation-induced Coriolis forces, causing dynamic coupling between the oscillation axes proportional to the angular rate input. In most of the reported micromachined vibratory rate gyroscopes, the proof mass m is driven at or near the resonance frequency in the drive direction by an external sinusoidal force, which are generally the electrostatic forces applied by comb-drive structures. When the gyroscope is subjected to an angular rotation, the Coriolis force with the same frequency as the driving signal is induced in the y-direction. If the drive and sense resonant frequencies are matched, the Coriolis force excites the system into resonance in the sense direction, as well. The resulting oscillation amplitude in the sense direction is proportional to the Coriolis force and, thus, to the angular velocity to be measured.

The dynamics of the single-mass 2-DOF gyroscope is understood more clearly starting with the assumption that the system is driven without feedback control in drive direction with a constant amplitude drive force F_(d) at the drive frequency ω_(d), namely F_(d)=F₀ sin ω_(d)t. The 2-DOF dynamical system will have two independent resonant frequencies: sense direction resonant frequency ω_(y)=(k_(y)/m)^(1/2) and drive direction resonant frequency ω_(x)=(k_(x)/m)^(1/2).

The rotation-induced Coriolis force F_(c)=2 mΩ_(z)dx/dt, which is proportional to drive direction oscillation amplitude, is the only driving force in the sense direction for an ideal gyroscope. Sense direction amplitude is proportional to the Coriolis force and, thus, to drive direction oscillation amplitude. If the proof mass m is driven into resonance in drive direction, i.e., ωd=ω_(x), a high sense direction amplitude is expected due to the increased Coriolis force resulting from large drive direction amplitudes achieved by resonance. If the system is driven at the sense direction resonant frequency, i.e., ω_(d)=ω_(y), then the sense direction amplitude is amplified by the quality factor due to resonance. Thus, when the resonance frequencies are mismatched ω_(d)≠ω_(x), the frequency response of the 2-DOF system has two resonant peaks, one at ω_(x) and another at ω_(y). When the resonant frequencies are tuned to match exactly, i.e., ω_(x)=ω_(y), the frequency response of the 2-DOF system has one combined resonant peak, which will provide a much larger response amplitude, leading to the highest sensitivity possible. However, the mode-matching requirement renders the system response very sensitive to variations in system parameters due to fabrication imperfections and fluctuations in operating conditions, which shift the drive or sense resonant frequencies. Inevitable fabrication imperfections affect both the geometry and the material properties of MEMS devices. The designed stiffness values deviate drastically due to etching processes, deposition conditions, or residual stresses. Variations in the temperature of the structure can also perturb the dynamical system parameters due to the temperature dependence of Young's Modulus and thermally induced localized stresses.

Various symmetric gyroscope designs have been reported based on enhancing performance by mode-matching and allowing to minimize temperature dependence. However, mode-matching requirements cannot be met without feedback control, even with the symmetric designs under the presence of the mentioned perturbations. For the devices packaged in high vacuum to enhance the sensitivity, the bandwidth of the resonance peaks is extremely narrow, leading to much tighter mode-matching requirements. Also the gain is affected significantly by fluctuations in damping conditions, which makes the device very vulnerable to any possible vacuum leak in the package. Furthermore, as the modes are matched closer, the mechanical interference between the modes becomes more significant, resulting in operation instability and drift. In order to suppress coupled oscillation and drift, various devices have been reported employing independent suspension beams for the drive and sense modes.

The 4-DOF gyroscope design concept illustrated in this specification eliminates the limitations due to mode-matching requirement, damping sensitivity and coupled oscillation challenges by utilizing mechanically decoupled 2-DOF nonresonant drive and sense oscillators incorporating three proof masses. 4-DOF MEMS gyroscopes comprised of two interconnected proof masses have been reported to achieve improved robustness; however, the drive and sense oscillators cannot be mechanically decoupled, and the dynamical response characteristics of the oscillators can't be set independently in these approaches.

2. 4-DOF Gyroscope Structure And Principle Of Operation

In the illustrated embodiment, a 4-DOF micromachined gyroscope system 10 is disclosed that utilizes dynamical amplification in the decoupled 2-DOF drive oscillators 12 and sense oscillators 14 in order to achieve large oscillation amplitudes without resonance. The overall 4-DOF dynamical system 10, namely 2-DOF in drive and 2-DOF in sense directions, is comprised of three interconnected proof masses 16, 18 and 20 as shown in FIG. 1.

The first mass 16 or m₁, which is the only mass 16 excited in the drive direction, which is here the x direction in FIG. 1, is constrained in the sense direction, which is the y direction in FIG. 1, and is free to oscillate only in the drive direction. The second mass 18 or m₂ and third mass 20 or m₃ are constrained with respect to each other in the x drive direction, thus oscillating as one combined mass in the x drive direction. However, masses 18 and 20 are free to oscillate independently in the y sense direction, forming the 2-DOF sense-direction oscillator. The first mass 16 and the combination of the second and third masses 18 and 20 form the 2-DOF drive-direction oscillator 12, where mass 16 is the driven mass as diagrammatically depicted in FIG. 2.

In order to minimize instability due to dynamical coupling between the drive and sense modes, the drive and sense-mode oscillators 12 and 14 are mechanically decoupled. The driven mass 16 oscillates only in the x drive direction, and possible anisoelasticities due to fabrication imperfections are suppressed by the suspension 22 fixed in the y sense direction, best shown in FIG. 4. The second mass 18 oscillates in both x drive and y sense directions, and generates the rotation-induced Coriolis force that excites the 2-DOF sense-direction oscillator 14. The sense direction response of the third mass 20, which comprises the vibration absorber of the 2-DOF sense-mode oscillator 14, is detected for measuring the input angular rate. Since the springs 24 shown in FIG. 2 that couple the sense mass 20 to mass 18 deform only for relative y sense direction oscillations, instability due to mechanical coupling of drive and sense directions is minimized, significantly enhancing gyroscopic performance due to reduced drift.

A. Coriolis Response

The frequency responses of the 2-DOF drive-mode oscillator 12 and the 2-DOF sense-mode oscillator 14 have two resonant peaks and a flat region between the peaks. The device 10 is nominally operated in the flat regions of the drive and sense-mode oscillators 12 and 14, where the response amplitudes of the oscillators 12 and 14 are less sensitive to parameter variations. In order to operate both of the drive and sense-mode oscillators 12 and 14 in their flat-region frequency bands, the flat regions of the oscillators 12 and 14 have to be designed to overlap as depicted in the graph of FIG. 3(a) by matching the drive and sense direction anti-resonance frequencies, as will be explained in below. However, in contrast to the conventional gyroscopes, the flat regions with significantly wider bandwidths can be overlapped without feedback control with sufficient precision in spite of fabrication imperfections and operation condition variations.

The response of the combined 4-DOF dynamical system to the rotation-induced Coriolis force will have a flat region in the frequency band coinciding to the flat regions of the independent drive and sense-mode oscillators as depicted in the graph of FIG. 3(b). When the device is operated in this flat region, the oscillation amplitudes in both drive and sense directions are relatively insensitive to variations in system parameters and damping. Thus, by utilizing dynamical amplification in the 2-DOF oscillators instead of resonance, increased bandwidth and reduced sensitivity to structural and thermal parameter fluctuations and damping changes are achieved. Consequently, the design concept resulting in improved robustness and long-term stability over the operating time of the device is expected to relax control requirements and tight fabrication and packaging tolerances.

B. Comparison of Response Characteristics With a Conventional Gyroscope

The proposed design approach allows the widening of the operation frequency range of the gyroscope to achieve improved robustness, while sacrificing the response amplitude in the y sense direction. The following numerical example demonstrates the trade-off between bandwidth of the gyroscope and the amplitude of response. For a clear comparison, we consider a conventional 2-DOF gyroscope with the same mass, stiffness and damping parameters as the isolated passive mass-spring system of the 4-DOF system, which is designed with matched resonance frequencies at 10.3 kHz in the drive and sense directions. It is assumed that both gyroscopes are vacuum packaged so that the pressure within the encapsulated cavity is equal to 100 miliTorrs (13.3 Pa), and are both excited to achieve 5 μm drive-direction oscillation amplitudes. Under these conditions, for 1°/s input angular rate, the conventional 2-DOF gyroscope will have a 2.8×10⁻³ μm response amplitude in the sense direction, while the sense mass of the 4-DOF gyroscope will have an amplitude of response equal to 0.72×10⁻³ μm. However, in the case of the conventional 2-DOF gyroscope, the extremely narrow bandwidth of the response (about 1.1 Hz) significantly limits the robustness of the device. In a 2-DOF system, a frequency mismatch of 0.1% between drive and sense directions causes drop of the sense-direction amplitude down to 1.15×10⁻³ μm (59% gain drop), and 1% frequency mismatch results in 0.14×10⁻³ μm oscillation amplitude (94% gain drop). In contrast, the 4-DOF gyroscope demonstrates significantly improved robustness against system parameter variations; 1% deviation in passive mass resonance frequency results in 0.70×10⁻³ μm amplitude (3% change in the gain). It should be also noted that, if the pressure is increased inside the package by 10%, it will lead to a 14% drop in gain of the conventional gyroscope, while the gain of the 4-DOF gyroscope will change by less than 0.1%.

Moreover, since the design space of the 4-DOF gyroscope is larger than of the conventional gyroscope, the design concept allows maximum flexibility in optimizing the system response. The optimal compromise between amplitude of the response and bandwidth can be obtained by selecting parameters of the system (ratio of masses and spring constants). For example, the gain of the 4-DOF system can be improved by trading-off bandwidth; if the coupling spring constant between the passive and active masses of the 4 DOF gyroscope is increased from 4.2 N/m to 4.8 N/m, the amplitude of the response in the sense direction will increase from 0.72×10⁻³ μm to 1.2×10⁻³ μm, while the response bandwidth will decrease from 23 Hz to 12 Hz, which is still over an order of magnitude larger than the bandwidth of the conventional gyroscope discussed above. Thus, the 4-DOF design concept provides more freedom in defining trade-offs between gain of the response (for higher sensitivity) and the system bandwidth (for increased robustness). Selection of the parameter set is typically guided by application requirements.

3. Dynamics Of The Gyroscope

The dynamics of the idealized model for the 4-DOF gyroscope system 10 is best understood in the noninertial coordinate frame associated with the gyroscope. As previously stated, the 4-DOF system 10 is comprised of three interconnected proof masses 16, 18, and 20 where each mass can be assumed to be a rigid body with a position vector attached to a rotating reference frame, resulting in an absolute acceleration in the inertial frame A {right arrow over (a _(A))}={right arrow over (a _(B))}+{right arrow over (Ω)}×{right arrow over (r _(B))}+{right arrow over (Ω)}×({right arrow over (Ω)}×{right arrow over (r_(B))})+2{right arrow over (Ω)}×{right arrow over (v _(B))} where the subscript A denotes “relative to inertial frame A,” where B denotes “relative to rotating gyroscope frame B,” where v and a are the velocity and acceleration vectors with respect to the designated reference frame respectively, and where Ω is the angular velocity vector of the gyroscope frame B relative to the inertial frame A. The term, 2 Ω×v_(B), is the Coriolis acceleration, which excites the system 10 in the y sense direction. Thus, when a mass 16, 18 or 20 is oscillating in the drive direction (x-axis) is subject to an angular rotation rate of Ω_(z) about the z-axis, the Coriolis acceleration induced in the sense direction (y-axis) is a_(y)=2 Ω_(z) dx/dt.

Similarly, the equations of motion for the three proof masses observed in the noninertial rotating frame can be expressed in the inertial frame as $\begin{matrix} {{m_{1}\overset{->}{a_{1}}} = {\overset{->}{F_{1}} + \overset{->}{F_{d}} - {2m_{1}\overset{->}{\Omega} \times \overset{->}{\upsilon_{1}}} - {m_{1}\overset{->}{\Omega} \times \left( {\overset{->}{\Omega} \times \overset{->}{r_{1}}} \right)} - {m_{1}\overset{.}{\overset{->}{\Omega}} \times \overset{->}{r_{1}}}}} \\ {{m_{2}\overset{->}{a_{2}}} = {\overset{->}{F_{2}} - {2m_{2}\overset{->}{\Omega} \times \overset{->}{\upsilon_{2}}} - {m_{2}\overset{->}{\Omega} \times \left( {\overset{->}{\Omega} \times \overset{->}{r_{2}}} \right)} - {m_{2}\overset{.}{\overset{->}{\Omega}} \times \overset{->}{r_{2}}}}} \\ {{m_{3}\overset{->}{a_{3}}} = {\overset{->}{F_{3}} - {2m_{3}\overset{->}{\Omega} \times \overset{->}{\upsilon_{3}}} - {m_{3}\overset{->}{\Omega} \times \left( {\overset{->}{\Omega} \times \overset{->}{r_{3}}} \right)} - {m_{3}\overset{.}{\overset{->}{\Omega}} \times \overset{->}{r_{3}}}}} \end{matrix}$ where F₁ is the net external vector force applied to mass 16, m₁, including elastic and damping forces from the substrate and elastic interaction force from mass 18, m₂; F₂ is the net external vector force applied to mass 18, m₂, including the damping force from the substrate and elastic interaction force from and masses 16 and 20; F₃ is the net external vector force applied to mass 20, m₃, including the damping force from the substrate and the elastic interaction force from mass 18, and is the driving force applied to mass 16. In the gyroscope frame, r₁, r₂, and r₃ are the position vectors, and v₁, v₂, and v₃ are the velocity vectors of masses 16, 18 and 20 respectively. Since the first mass 16 is fixed in the y sense direction [i.e., y₁(t)=0 and masses 18 and 20 move together in the x drive direction i.e., x₂(t)=x₃(t)], the 4-DOF equations of motion (along the x-axis and y-axis) of the three mass subsystems subjected to an angular rate of Ω_(z) about the axis normal to the plane of motion (z-axis) become $\begin{matrix} {{{m_{1}{\overset{¨}{x}}_{1}} + {c_{1\text{?}}{\overset{.}{x}}_{1}} + {k_{1\text{?}\text{?}}x_{1}}} = {{k_{2x}\left( {x_{2} - x_{1}} \right)} + {m_{1}\Omega_{z}^{2}x_{1}} + {F_{d}(t)}}} \\ {{\left( {m_{2} + m_{3}} \right){\overset{¨}{x}}_{2}} + {\left( {\text{?} + c_{3x}} \right){\overset{.}{x}}_{2}} +} \\ {k_{2x}\left( {x_{2} - x_{1}} \right)} \\ {= {{\left( {m_{2} + m_{3}} \right)\Omega_{z}^{2}x_{2}} + {2m_{2}\Omega_{z}{\overset{.}{y}}_{z}} +}} \\ {{2m_{3}\Omega_{z}{\overset{.}{y}}_{3}} + {m_{2}{\overset{.}{\Omega}}_{z}y_{2}} + {m_{3}{\overset{.}{\Omega}}_{z}y_{3}m_{2}{\overset{¨}{y}}_{2}} +} \\ {{c_{2_{y}}{\overset{.}{y}}_{2}} + {k_{2_{y}}y_{2}}} \\ {= {{k_{3_{y}}\left( {y_{3} - y_{2}} \right)} + {m_{2}\Omega_{z}^{2}y_{2}} - {2m_{2}\Omega_{Z}{\overset{.}{x}}_{2}} -}} \\ {{m_{2}{\overset{.}{\Omega}}_{z}x_{2}m_{3}{\overset{¨}{y}}_{3}} + {c_{3_{y}}{\overset{.}{y}}_{3}} + {k_{3_{y}}\left( {y_{3} - y_{2}} \right)}} \\ {= {{m_{3}\Omega_{z}^{2}y_{3}} - {2m_{3}\Omega_{z}{\overset{.}{x}}_{3}} - {m_{3}{\overset{.}{\Omega}}_{z}x_{3}}}} \end{matrix}$ ?indicates text missing or illegible when filed where Fd(t) is the driving electrostatic force applied to the active mass at the driving frequency ω_(d), and Ω_(z) is the angular velocity applied to the gyroscope about the z-axis. It should be noted that the terms 2 m₂ Ω_(z)dx₂/dt and 2 m₃ω_(z)dx₃/dt are the Coriolis forces that excite the system in the y sense direction, and the Coriolis response of mass 20 in the y₃ sense-direction is detected for angular rate measurement. 4. Mems Implementation of the Design Concept

The MEMS implementation of the conceptual design presented above is now described. First, the suspension subsystem design for the 4-DOF system 10 is investigated with the derivation of the stiffness values, then the damping components of the dynamic system derived above are analyzed. Finally, the issue of achieving dynamic amplification in the drive and sense modes is addressed, along with an approach for determining optimal system parameters to maximize sensor performance.

A. Suspension Design

The complete suspension subsystem of the device is designed such that the first mass 16 with 1-DOF is fixed in the y sense direction, and is free to oscillate only in the x drive direction, the second mass 18 has 2-DOF, oscillating in both x drive and y sense directions, and the third mass 20 with 1-DOF is fixed with respect to in the x drive direction, and free to oscillate independently in the y sense direction as best shown in the diagrammatic enlargement of FIG. 4.

The suspension 22 that connects to the substrate 24 via anchors 26 is comprised of four double-folded flexures 28 a, 28 b, 28 c, and 28 d, where each beam of length L_(1x) in the folded flexures 28 a, 28 b, 28 c, and 28 d can be modeled as a fixed guided beam deforming in the orthogonal direction to the axis of the beam, leading to an overall stiffness of $k_{1x} = {{\frac{4}{2}\left( {\frac{1}{2}\frac{3{EI}}{\frac{L_{1x}^{3}}{2}}} \right)} = \frac{2{Etw}^{3}}{L_{1x}^{3}}}$ where E is the Young's Modulus, I is the second moment of inertia of the beam cross-section, t is the beam thickness, and w is the beam width. Possible anisoelasticities due to fabrication imperfections are suppressed having the driven mass 16 oscillating purely along the geometrical x drive axis by this suspension 22, including flexures 28 a and 28 b, constraining in the y sense direction. Effects of residual stresses are also decreased by employing folded springs as flexures 28 a, 28 b, 28 c, and 28 d allowing stress-relief.

The second mass 18 is connected to mass 16 by four flexure beams comprised of two double-folded flexures 28 b and 28 c of length L_(2x) and L_(2y) that deform independently in the x drive and y sense directions. These beams can also be modeled similarly, resulting in m₂ drive and sense direction stiffness values of ${k_{2x} = \frac{2{Etw}^{3}}{L_{2x}^{3}}},{k_{2y} = {\frac{2{Etw}^{3}}{L_{2y}^{3}}.}}$

In the calculation of the spring rates in the x drive or y sense direction, the effect of axial strain in the other beams is neglected. The assumption is reasonable in this analysis, since the axial stiffness of a beam, k_(axial)=Etw/L, is generally four orders of magnitude (L²/w² times) larger than the fixed-guided stiffness, which means the beams under axial load can be assumed infinitely stiff.

The suspension 22 connecting the third mass 20 to is made up of four three-folded flexures 28 b, 28 c and 28 d for this specific design, fixing mass 20 with respect to mass 18 in the x drive-direction. Since these flexures 28 b, 28 c and 28 d are stiff in the x drive-direction and deform only in the y sense direction, instability due to dynamical coupling between the drive and sense modes in the sensing element is eliminated, minimizing zero-rate drift of the gyroscope. With a length of L_(3y) for each beam, the overall stiffness is $k_{3y} = {\frac{4}{3}{\frac{{Etw}^{3}}{L_{3y}^{3}}.}}$

The lengths L_(1x), L_(2x), L_(2y) and L_(3y) are designed according to the optimized stiffness values derived below. Through this suspension design, mechanically decoupled 2-DOF x drive and y sense-mode oscillators are formed with the three proof masses 16, 18 and 20, while instability due to mechanical coupling of x drive and y sense directions is minimized, leading to significantly reduced zero-rate drift.

B. Damping Estimation

The dominant mechanism of energy dissipation in the gyroscope structure is the internal friction of the fluid confined between the proof mass surfaces and the stationary surfaces. The damping coefficients c_(1x), c_(2x), c_(3x), and C_(3y) in the gyroscope dynamical system shown in FIG. 2 are due to the viscous effects of the air between the masses 16, 18 and 20 and the substrate 24, and in between the comb-drive 28 and sense capacitor fingers 30 as shown in FIG. 1.

For the driven mass 16, the total damping in the drive mode can be approximated as the combination of the slide film damping between the mass 16 and the substrate 24, and the slide film damping between the integrated comb fingers 30. Assuming an instantaneously developed linear fluidic velocity profile, slide film damping can be modeled as a Couette flow, leading to $c_{1x} = {{\mu_{z}\frac{A_{1}}{z_{0}}} + {\mu_{e}\frac{2N_{comb}l_{comb}t}{y_{comb}}}}$ where A₁ is the area of the active mass, z₀ is the elevation of the proof mass from the substrate, t is the thickness of the structure, N_(comb) is the number of comb-drive fingers, y_(comb) is the distance between the fingers, and I_(comb) is the overlapping length of the fingers. The effective viscosity is μ_(e)=μ_(p)p, where p is the ambient pressure within the cavity of the packaged device, and μ_(p)=3.7×10⁻⁶ kg/m² .s.torr (2.78×10⁻⁶ [(kg/m² .s.Pa)] is the viscosity constant for air.

Since there are no actuation and sensing capacitors attached to the second mass 18, the damping coefficients in the x drive and y sense directions are equal, and are only due to the Couette flow between the proof mass 18 and the substrate 24. $c_{2x} = {c_{2y} = {\mu_{e}{\frac{A_{2}}{z_{0}}.}}}$

Thus, the approach results in reduced energy dissipation on mass 18, and also symmetric damping in the drive and sense directions. For the third mass 20, the total damping in the drive mode results from Couette flow between the mass 20 and the substrate 24, as well as Couette flow between the air-gap capacitor fingers 28 $c_{3x} = {{\mu_{e}\frac{A_{3}}{z_{0}}} + {\mu_{e}\frac{2N_{cap}l_{cap}t}{y_{cap}}}}$ where A₃ is the area of the passive mass, N_(cap) is the number of air-gap capacitors, y_(cap) is the distance between the capacitor fingers 30, and I_(cap) is the overlapping length of the fingers 30. Damping on mass 20 in the sense mode can be estimated as the combination of Couette flow between the proof mass 20 and the substrate 24, and the squeeze-film damping between the air-gap capacitor fingers 30: $c_{3y} = {{\mu_{e}\frac{A_{3}}{z_{0}}} + {\mu_{e}{\frac{7N_{cap}l_{cap}t^{3}}{y_{cap}^{3}}.}}}$

It should be emphasized that the design approach suggests the sensing mass 20 to have minimal mass in contrast to the conventional gyroscopes. This allows minimizing the overall energy dissipation on the sensing mass 20 due to the reduced footstep area of the mass 20. More accurate slide-film damping models can be generated considering the gas-rarefaction effects at low pressures and narrow gaps, kinetic gas models, or plate motions that propagate into the fluid with rapidly diminishing steady-state amplitude. Including the nonlinear effects of squeeze-film damping together with computational fluid dynamics simulations will also improve the accuracy of the damping model.

C. Parameter Optimization for Dynamic Amplification

Since the foremost mechanical factor determining the performance of the gyroscope is the sense direction deflection of the sensing element, mass 20, due to the input rotation, the parameters of the dynamical system should be optimized to maximize the oscillation amplitude of mass 20 in the y sense direction.

However, the optimal compromise between amplitude of the response and bandwidth should be obtained to maintain robustness against parameters variations, while the response amplitude is sufficient for required sensitivity. The trade-offs between gain of the response (for higher sensitivity) and the system bandwidth (for increased robustness) will typically be guided by application requirements.

For the purpose of optimizing each parameter in the dynamical system, the overall 4-DOF gyroscope system 10 can be decomposed into the 2-DOF drive-mode oscillator 12 diagrammatically depicted in FIG. 5(a) and the 2-DOF sense-mode oscillator 14 diagrammatically depicted in FIG. 5(b), analyzed separately below.

1) Drive Mode Parameters:

The first mass 16 (which is free to oscillate only in the x drive direction, and is fixed in the y sense direction) and the combination of the second and third masses 18 and 20 (which are fixed with respect to each other in the x drive direction) form the 2-DOF drive-direction oscillator 12, where mass 16 is driven by the electrostatic forces. The main objective of parameter optimization in the drive mode is to maximize the rotation-induced Coriolis force generated by the second mass 18. This force F_(c2)=2 m₂ Ω_(z)dx/dt is the dominant force exciting the 2-DOF sense-direction oscillator 14, and is proportional to the sensor sensitivity.

In the drive mode, the gyroscope 10 is simply a 2-DOF system. The sinusoidal drive force is applied to the first mass 16 (active mass) by the comb drive structures 28. The combination of the second and the third masses 18 and 20 comprise the vibration absorber 36 (passive mass) of the 2-DOF oscillator 12, which mechanically amplifies the oscillations of mass 16. Approximating the gyroscope 10 by a lumped mass-spring-damper model as shown in FIG. 5(a), the equations of motion in the drive direction can be expressed as m ₁ {umlaut over (x)} ₁ +c _(1x) {umlaut over (x)} ₁ +k _(1x) x ₁ =k _(2x)(x ₂ −x ₁)+F _(d)(m ₂ +m ₃){umlaut over (x)}₂ +c _(2x) {umlaut over (x)} ₂ +k _(2x) x ₂ =k _(2x) x ₁.

When a constant-amplitude sinusoidal force F_(c)=F₀ sin(ωt) is applied on the active mass 16 by the interdigitated comb-drives 28, the steady-state response of the 2-DOF system 12 as illustrated by graph FIG. 6(a) will be as seen in the equation, $\begin{matrix} {X_{1} = {\frac{F_{0}}{k_{1x}}\frac{1 - \left( \text{?} \right)^{2} + {j\text{?}}}{{\left\lbrack {1 + \frac{k\text{?}}{k\text{?}} - \left( \text{?} \right)^{2} + {j\text{?}}} \right\rbrack\quad\left\lbrack {1 - \left( \text{?} \right)^{2} + {j\quad\text{?}}} \right\rbrack} - \frac{k\text{?}}{k\text{?}}}}} \\ {X_{2} = {\frac{F_{0}}{k_{1}}\frac{1}{{\left\lbrack {1 + \frac{k\text{?}}{k\text{?}} - \left( \text{?} \right)^{2} + {j\text{?}}} \right\rbrack\quad\left\lbrack {1 - \left( \text{?} \right)^{2} + {j\quad\text{?}}} \right\rbrack} - \frac{k\text{?}}{k\text{?}}}}} \end{matrix}$ ?indicates text missing or illegible when filed where ω_(1x)=(k_(1x)/m₁)^(1/2) and ω_(2x)=(k_(2x)/[m₂+m₃])^(1/2) are the resonant frequencies of the isolated active mass-spring system 38 and passive mass-spring system 40, respectively. When the driving frequency ω_(drive) is matched with the resonant frequency of the isolated passive mass-spring system 40, i.e., ω_(drive)=(k_(2x)/[m₂+m₃])^(1/2), the passive mass 18 and 20 moves to exactly cancel out the input force F_(d) applied on the active mass, and maximum dynamic amplification is achieved.

Maximizing the Coriolis Force F_(c2)=2 m₂ ω_(z)dx₂/dt generated by mass 18 requires a large proof mass 18, and large drive direction amplitude x₂. However, if the response of the passive mass 18 and 20 in the x drive direction is observed for different m₂ values with m₁ being fixed, it is seen that for high oscillation amplitudes of passive mass 18 and 20, mass 18 and 20 should be minimized as illustrated in the graph of FIG. 7(a). The anti-resonant frequency ω_(2x) of the isolated passive mass spring system 38 is determined according to gyroscope operating frequency specifications, noting that larger Coriolis forces are induced at higher frequencies, but the oscillation amplitudes become larger at lower frequencies as illustrated in the graph of FIG. 7(b). Once ω_(2x) is fixed, the drive direction spring constant k_(2x) is obtained from ω_(2x) and masses 18 and 20.

The optimal drive direction mass ratio μ_(x)=(m₂+m₃)/m₁ determining the mass of the active mass 16 is dictated by low sensitivity to damping, response bandwidth and oscillation amplitude. In order to achieve insensitivity to damping, the resonance peaks of the 2-DOF system response have to be separated far enough, which imposes a minimum value of μ_(x). For a wide bandwidth, a large μ_(x) is required for large enough separation of the peaks; however, to prevent gain drop, the peak separation should be minimized as illustrated in the graph of FIG. 8(a).

The degree of mechanical amplification depends on the ratio of the resonance frequencies of the isolated active system 38 and passive mass-spring system 40, namely γ_(x)=ω_(2x)/ω_(2x)=(k_(2x)m₁/k_(1x)(m₂+m₃))^(1/2). The optimal frequency ratio γ_(x) has to be determined such that Yx is high enough for high mechanical amplification, and high oscillation amplitudes of passive mass as illustrated in the graph of FIG. 8(b). From the optimal values of μ_(x) and ω_(1x), the drive direction spring constant k_(1x) of the active mass 16 is obtained. Finally, the damping conditions of the overall device have to be checked to verify that damping values are in the region where the response gain in the antiresonance region is insensitive to damping variations as illustrated by the graph of FIG. 9.

2) Sense Mode Parameters:

The 2-DOF sense-direction oscillator 14 in FIG. 5 b is formed by masses 18 and 20, where mass 20 acts as the vibration absorber to achieve large sense direction oscillation amplitudes due to mechanical amplification. The objective of parameter optimization in the sense mode is to maximize y₃, which is the sense direction oscillation amplitude of the sensing element 20.

The system is driven by the rotation-induced Coriolis forces F_(c2)=2 m₂ω_(z)dx₂/dt and F_(c3)=2 m₃ ω_(z)dx₂/dt generated by mass 18 and 20 respectively. The dominant force exciting the 2-DOF sense direction oscillator is F_(c2), since the mass of the active mass 18 is significantly larger than the mass of the passive mass 20. The equations of motion of the lumped mass-spring-damper model of the sense-mode oscillator become m _(2ÿ) ₂ +c _(2y) ÿ ₂ +k _(2y) u ₂ =k _(3y)(y ₃ −y ₂)+2m ₂Ω_(x) {umlaut over (x)} ₂ m ₃ ÿ ₃ +c _(3y) ÿ ₃ +k _(3y) y ₃ =k _(3y) y ₂+2m ₃Ω_(x) {umlaut over (x)} ₂. (3)

The response of the system to a constant-amplitude sinusoidal force is similar to that of the drive-mode oscillator as illustrated in the graph of FIG. 6(b), with the resonant frequencies of the isolated active and passive mass-spring systems of ω_(2y)=(k_(2y)/m₂)^(1/2) and ω_(3y)=(k_(3y)/m₃)^(1/2) respectively. When the frequency of the sinusoidal Coriolis force is matched with the resonant frequency of the isolated passive mass-spring system 40, the passive mass 20 achieves maximum dynamic amplification.

The most important advantage of decoupling the 2-DOF drive oscillator 12 and sense-mode oscillator 36 is that the Coriolis force that excites the sensing element 20 is not generated by the sensing element 20. Instead, F_(c2)=2 m₂ ω_(z)dx₂/dt generated by mass 18 excites the active mass 16. The dynamics of the 2-DOF oscillator dictates that the passive mass 20 has to be minimized in order to maximize its oscillation amplitude. Since the Coriolis Force F_(c3)=2 ω_(z)dx₂/dt generated by mass 20 is not required to be large, the sensing element 20 can be designed to be as small as the mechanical design requirements and fabrication parameters allow.

Similarly, the optimal mass ratio μ_(y)=m₃/m₂ in the sense direction determining the mass of the active mass 18 is selected to achieve insensitivity to damping variation, a wide response bandwidth and a large oscillation amplitude. The optimal ratio of the resonance frequencies of the isolated active system involving mass 20 and passive mass-spring system involving mass 18, γ_(y)=ω_(3y)/ω_(2y)=(k_(3y)m₂/k_(2y)m₃)^(1/2) is also selected to maximize oscillation amplitudes of passive mass 18.

3) Overall 4-DOF System Parameters:

The frequency response of both of the 2-DOF drive oscillator 12 and sense-mode oscillators 14 have two resonant peaks and a flat region between the peaks. To achieve maximum robustness against fluctuations in the system parameters, both of the 2-DOF oscillators 12 and 14 have to be operated in the flat region of their response curves. Since the Coriolis forces that drive the sense-direction oscillator 14 are at the same frequency as the electrostatic forces exciting the drive-direction oscillator 12, the flat-region frequency band of the oscillators 12 and 14 have to be overlapped, by designing the drive and sense anti-resonance frequencies to match. Thus, the requirement ω_(3y)=ω_(2x), i.e., (k_(3y)/m₃)^(1/2)=(k_(2x)/(m₂+m₃))^(1/2) determines the optimal system parameters, together with the optimized ratios μ_(x)=(m₂+m₃)/m₁, γ_(x)=ω_(2x)/ω_(1x), μ_(y)=m₃/m₂, and γ_(y)=ω_(3y)/ω_(2y). Since the flat regions have significantly wider bandwidths, they can be overlapped with sufficient precision without feedback control in the presence of imperfections, in contrast to the conventional gyroscopes.

Exciting the 2-DOF drive-direction oscillator 12 at its anti-resonance frequency results in minimal oscillation amplitudes of the electrostatically driven mass as illustrated in the graph of FIG. 6(a). Thus, by minimizing the travel distance of the actuators, higher actuation stability and linearity is achieved by means of mechanical amplification. Also, since the 2-DOF sense-direction oscillator 14 is excited at its anti-resonance frequency, the sense-direction oscillation amplitude of is minimized as illustrated in the graph of FIG. 6(b). This results in a minimal coupling between the oscillation modes, leading to reduced zero-rate drift of the gyroscope.

In summary, a 4-DOF nonresonant micromachined gyroscope design concept is disclosed, which eliminates the mode-matching requirement, and minimizes instability and zero-rate drift due to mechanical coupling between the drive and sense modes. The proposed approach is based on forming mechanically decoupled 2-DOF drive-mode oscillator 12 and DOF sense-mode oscillator 14 using three interconnected proof masses 16, 18 and 20. The overall 4-DOF system 10 utilizes dynamical amplification in the drive and sense directions to achieve large oscillation amplitudes without resonance resulting in increased bandwidth and reduced sensitivity to structural and thermal parameter fluctuations and damping changes, while mechanically decoupling the drive direction oscillations from the sense direction oscillations leads to improved robustness and long-term stability over the operating time of the device. Furthermore, employing three proof masses 16, 18 and 20 to form the decoupled oscillators 12 and 14 allows the Coriolis force that excites the sensing element to be generated by a larger intermediate proof mass, resulting in larger Coriolis forces for increased sensor sensitivity. Thus, the design concept, which provides improved robustness and stability with minimal compromise in performance, is relaxes control system requirements and tight fabrication and packaging tolerances.

Many alterations and modifications may be made by those having ordinary skill in the art without departing from the spirit and scope of the invention. Therefore, it must be understood that the illustrated embodiment has been set forth only for the purposes of example and that it should not be taken as limiting the invention as defined by the following claims. For example, notwithstanding the fact that the elements of a claim are set forth below in a certain combination, it must be expressly understood that the invention includes other combinations of fewer, more or different elements, which are disclosed in above even when not initially claimed in such combinations.

The words used in this specification to describe the invention and its various embodiments are to be understood not only in the sense of their commonly defined meanings, but to include by special definition in this specification structure, material or acts beyond the scope of the commonly defined meanings. Thus if an element can be understood in the context of this specification as including more than one meaning, then its use in a claim must be understood as being generic to all possible meanings supported by the specification and by the word itself.

The definitions of the words or elements of the following claims are, therefore, defined in this specification to include not only the combination of elements which are literally set forth, but all equivalent structure, material or acts for performing substantially the same function in substantially the same way to obtain substantially the same result. In this sense it is therefore contemplated that an equivalent substitution of two or more elements may be made for any one of the elements in the claims below or that a single element may be substituted for two or more elements in a claim. Although elements may be described above as acting in certain combinations and even initially claimed as such, it is to be expressly understood that one or more elements from a claimed combination can in some cases be excised from the combination and that the claimed combination may be directed to a subcombination or variation of a subcombination.

Insubstantial changes from the claimed subject matter as viewed by a person with ordinary skill in the art, now known or later devised, are expressly contemplated as being equivalently within the scope of the claims. Therefore, obvious substitutions now or later known to one with ordinary skill in the art are defined to be within the scope of the defined elements.

The claims are thus to be understood to include what is specifically illustrated and described above, what is conceptionally equivalent, what can be obviously substituted and also what essentially incorporates the essential idea of the invention. 

1. A 4-DOF nonresonant micromachined gyroscope comprising: a 2-DOF drive-mode oscillator; and a 2-DOF sense-mode oscillator, where the drive-mode oscillator and sense-mode oscillators are mechanically decoupled and employ three interconnected proof masses.
 2. The 4-DOF nonresonant micromachined gyroscope of claim 1 wherein the 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator utilize dynamical amplification in the drive and sense directions to achieve large oscillation amplitudes without resonance resulting in increased bandwidth and reduced sensitivity to structural and thermal parameter fluctuations and damping changes.
 3. The 4-DOF nonresonant micromachined gyroscope of claim 1 wherein one of the three masses is an intermediate proof mass and another is a sensing element, and wherein the 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator are mechanically decoupled in the drive direction from the sense direction for robustness and long-term stability and to allow the Coriolis force that excites the sensing element to be generated by the intermediate proof mass with a larger mass, resulting in larger Coriolis forces for increased sensor sensitivity so that control system requirements and tight fabrication and packaging tolerances are relaxed, mode-matching is eliminated, and instability and zero-rate drift due to mechanical coupling between the drive and sense modes is minimized.
 4. The 4-DOF nonresonant micromachined gyroscope of claim 1 wherein the 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator include a drive means for driving a mass in a drive direction and a sense means for sensing motion of a mass in a sense direction, and wherein the three interconnected masses comprise a first, second and third mass, the first mass being the only mass excited by the drive means, oscillating in the drive direction and being constrained from movement in the sense direction, the second and third masses being constrained from movement with respect to each other in the drive direction and oscillating together in the drive direction but oscillating independently from each other in the sense direction, the third mass being fixed with respect to the second mass in the drive direction, but free to oscillate in the sense direction, the first mass as a driven mass and the second and third masses collectively as a passive mass comprising the drive-mode oscillator, the second and third masses comprising the sense-mode oscillator.
 5. The 4-DOF nonresonant micromachined gyroscope of claim 4 wherein the second mass oscillates in the drive and sense directions to generate rotation-induced Coriolis force that excites the 2-DOF sense-mode oscillator, a sense direction response of the third mass, which comprises the vibration absorber of the 2-DOF sense-mode oscillator, is detected for measuring the input angular rate.
 6. The 4-DOF nonresonant micromachined gyroscope of claim 1 wherein the 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator comprise a drive means for driving a mass in a drive direction, a sense means for sensing motion of a mass in a sense direction, and a substrate on which the drive-mode oscillator and sense-mode oscillator are disposed, wherein the three interconnected masses comprise a first, second and third mass, where the first mass is anchored to the substrate by a first flexure which allows movement substantially only in the drive direction, where the second mass is coupled to the first mass by a second flexure that allows movement in the drive and the sense directions, and where the third mass is coupled to the second mass by a third flexure which allows movement substantially only in the sense direction.
 7. The 4-DOF nonresonant micromachined gyroscope of claim 6 wherein the first, and third flexures are folded micromachined springs having a resiliency substantially in only one direction and wherein the second flexure is comprised of two coupled folded micromachined springs, each having a resiliency substantially in only one of two different directions.
 8. The 4-DOF nonresonant micromachined gyroscope of claim 1 wherein the 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator each have two resonant peaks and a flat region between the peaks, the gyroscope being operated in the flat regions of the drive and sense-mode oscillators.
 9. The 4-DOF nonresonant micromachined gyroscope of claim 8 wherein the 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator are arranged and configured to have matching drive and sense direction anti-resonance frequencies.
 10. The 4-DOF nonresonant micromachined gyroscope of claim 1 wherein the 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator comprise a drive means for driving a mass in a drive direction, and a sense means for sensing motion of a mass in a sense direction, wherein the three interconnected masses comprise a first, second and third mass and coupled flexures, the second and the third masses combining to comprise a vibration absorber of the drive-mode oscillator, which vibration absorber mechanically amplifies the oscillations of the first mass.
 11. The 4-DOF nonresonant micromachined gyroscope of claim 10 wherein the first mass is driven at a driving frequency, ω_(drive), by means of a input force F_(d), which driving frequency, ω_(drive), is matched with the resonant frequency of an isolated passive mass-spring system comprised of the second and third masses and coupled flexures, which passive mass-spring system moves to cancel out the input force F_(d) applied to the first mass, so that maximum dynamic amplification is achieved.
 12. The 4-DOF nonresonant micromachined gyroscope of claim 1 wherein the 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator comprise a drive means for driving a mass in a drive direction, and a sense means for sensing motion of a mass in a sense direction, wherein the three interconnected masses comprise a first, second and third mass and coupled flexures, where the third mass acts as the vibration absorber in the sense-mode oscillator to achieve large sense direction oscillation amplitudes due to mechanical amplification.
 13. The 4-DOF nonresonant micromachined gyroscope of claim 12 wherein a sinusoidal Coriolis force is applied to the second mass, and where the frequency of the sinusoidal Coriolis force is matched with a resonant frequency of the isolated passive mass-spring system of the third mass and its coupled flexures, so that the third mass achieves maximum dynamic amplification.
 14. The 4-DOF nonresonant micromachined gyroscope of claim 1 wherein the 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator comprise a drive means for driving a mass in a drive direction, and a sense means for sensing motion of a mass in a sense direction, wherein the three interconnected masses comprise a first, second and third mass and coupled flexures, wherein the frequency response of both the drive-mode oscillator and sense-mode oscillator have two resonant peaks and a flat region between the peaks, wherein both of the drive-mode oscillator and sense-mode oscillator are operated in the flat region of their response curves, and where the drive anti-resonance frequency, ω_(2x), of the second mass and sense anti-resonance frequency, ω_(3y), of the third mass are matched, namely where ω_(3y)=ω_(2x), or equivalently (k_(3y)/m₃)^(1/2)=(k_(2x)/(m₂+m₃))^(1/2) determines the optimal system parameters, together with the optimized ratios μ_(x)=(m₂+m₃)/m₁, γ_(x)=ω_(2x)/ω_(1x), μ_(y)=m₃/m₂, and γ_(y)=ω_(3y)/ω_(2y), where k_(3y) is the spring constant of the flexures coupled to the third mass, where m₃ is the magnitude of the third mass, k_(2x) is the spring constant of the flexures coupled to the second mass, m₂ is the magnitude of the second mass, m₃ is the magnitude of the third mass, ω_(1x) is the drive anti-resonance frequency of the first mass, and ω_(2y) is the sense anti-resonance frequency of the second mass.
 15. A method of operating a 4-DOF nonresonant micromachined gyroscope comprising: driving a 2-DOF drive-mode oscillator with an applied force; driving a 2-DOF sense-mode oscillator with a Coriolis force derived from the 2-DOF drive-mode oscillator; and mechanically decoupling the drive-mode oscillator and sense-mode oscillators.
 16. The method of claim 15 wherein driving the 2-DOF drive-mode oscillator and driving the 2-DOF sense-mode oscillator dynamical amplifies motion in the drive and sense directions to achieve large oscillation amplitudes without resonance to result in increased bandwidth and reduced sensitivity to structural and thermal parameter fluctuations and damping changes.
 17. The method of claim 15 where mechanically decoupling the drive-mode oscillator and sense-mode oscillators comprises mechanically decoupling the drive-mode oscillator and sense-mode oscillators in the drive direction from the sense direction for robustness and long-term stability and exciting a sense element in the sense-mode oscillator by a Coriolis force generated by an intermediate proof mass employed in both the drive-mode and sense mode oscillators, the intermediate proof mass being provided with a larger mass than the sense element, resulting in larger Coriolis forces for increased sensor sensitivity so that control system requirements and tight fabrication and packaging tolerances are relaxed, mode-matching is eliminated, and instability and zero-rate drift due to mechanical coupling between the drive and sense modes is minimized.
 18. The method of claim 15 wherein driving the 2-DOF drive-mode oscillator and driving the 2-DOF sense-mode oscillator comprises driving a mass in a drive direction and sensing motion of a mass in a sense direction, and wherein the 2-DOF drive-mode oscillator and the 2-DOF sense-mode oscillator comprise three interconnected masses namely a first, second and third mass, exciting the first mass only by a drive means, oscillating the first mass in the drive direction with a driving force and constraining movement of the first mass in the sense direction, constraining movement of the second and third masses with respect to each other in the drive direction, oscillating the second and third masses together in the drive direction but oscillating the second and third masses independently from each other in the sense direction, the third mass being fixed with respect to the second mass in the drive direction, oscillating the third mass in the sense direction, the first mass as a driven mass and the second and third masses collectively as a passive mass comprising the drive-mode oscillator, the second and third masses comprising the sense-mode oscillator.
 19. The method of claim 18 wherein oscillating the second mass in the drive and sense directions generates a rotation-induced Coriolis force that excites the 2-DOF sense-mode oscillator, and detecting a sense direction response of the third mass, which comprises the vibration absorber of the 2-DOF sense-mode oscillator, for measuring the input angular rate.
 20. The method of claim 15 wherein the 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator comprise a drive means for driving a mass in a drive direction, a sense means for sensing motion of a mass in a sense direction, and a substrate on which the drive-mode oscillator and sense-mode oscillator are disposed, wherein the three interconnected masses comprise a first, second and third mass, further comprising anchoring the first mass to the substrate by a first flexure and moving the first mass substantially only in the drive direction, moving the second mass coupled to the first mass by a second flexure in the drive and the sense directions, and moving the third mass coupled to the second mass by a third flexure substantially only in the sense direction.
 21. The method of claim 20 further comprising coupling the first, second and third masses by the first and third flexures by providing folded micromachined springs having a resiliency substantially in only one direction and by the second flexure which is comprised of two coupled folded micromachined springs, each having a resiliency substantially in only one of two different directions.
 22. The method of claim 15 wherein driving the 2-DOF drive-mode oscillator and driving 2-DOF sense-mode oscillator comprises operating the gyroscope in the flat regions of the drive and sense-mode oscillators between two resonant peaks.
 23. The method of claim 22 further comprising matching drive and sense direction anti-resonance frequencies of the 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator.
 24. The method of claim 15 wherein the 2-DOF drive-mode oscillator and 2-DOF sense-mode oscillator comprise a drive means for driving a mass in a drive direction, and a sense means for sensing motion of a mass in a sense direction, wherein the three interconnected masses comprise a first, second and third mass and coupled flexures, the second and the third masses combining to comprise a vibration absorber of the drive-mode oscillator, further comprising mechanically amplifying the oscillations of the first mass by means of the vibration absorber.
 25. The method of claim 24 further comprising driving the first mass at a driving frequency, ω_(drive), by means of a input force F_(d), matching the driving frequency, ω_(drive), with the resonant frequency of an isolated passive mass-spring system comprised of the second and third masses and coupled flexures, and moving the passive mass-spring system to cancel out the input force F_(d) applied to the first mass, so that maximum dynamic amplification is achieved.
 26. The method of claim 15 wherein driving the 2-DOF drive-mode oscillator and driving 2-DOF sense-mode oscillator comprise driving a mass in a drive direction, and sensing motion of a mass in a sense direction, and mechanically amplifying sense direction oscillation amplitudes with a third mass acting as the vibration absorber in the sense-mode oscillator.
 27. The method of claim 26 further comprising applying a sinusoidal Coriolis force to a second mass, and matching the frequency of the sinusoidal Coriolis force with a resonant frequency of an isolated passive mass-spring system of the third mass and its coupled flexures, so that the third mass achieves maximum dynamic amplification.
 28. The method of claim 15 wherein driving the 2-DOF drive-mode oscillator and driving 2-DOF sense-mode oscillator comprise driving a mass in a drive direction, and sensing motion of a mass in a sense direction, wherein the frequency response of both the drive-mode oscillator and sense-mode oscillator have two resonant peaks and a flat region between the peaks, operating both the drive-mode oscillator and sense-mode oscillator in the flat region of their response curves, and matching the drive anti-resonance frequency, ω_(2x), of the second mass and sense anti-resonance frequency, ω_(3y), of the third mass, namely setting ω_(3y)=ω_(2x), or equivalently (k_(3y)/m₃)^(1/2)=(k_(2x)/(m₂+m₃))^(1/2) and determining therefrom the optimal system parameters, together with the optimized ratios μ_(x)=(m₂+m₃)/m₁, γ_(x)=ω_(2x)/ω_(1x), μ_(y)=m₃/m₂, and γ_(y)=ω_(3y)/ω_(2y), where k_(3y) is the spring constant of the flexures coupled to the third mass, where m₃ is the magnitude of the third mass, k_(2x) is the spring constant of the flexures coupled to the second mass, m₂ is the magnitude of the second mass, m₃ is the magnitude of the third mass, ω_(1x) is the drive anti-resonance frequency of the first mass, and ω_(2y) is the sense anti-resonance frequency of the second mass. 